A novel encoding mechanism for particle physics

NUCLEAR PHYSICS AND INTERDISCIPLINARY RESEARCH

A novel encoding mechanism for particle physics

Zhi-Guang Tan，

Sheng-Jie Wang，

You-Neng Guo，

Hua Zheng ，

Aldo Bonasera

Nuclear Science and Techniques

Vol.35, No.8

Article number 144

Published in print Aug 2024

Available online 21 Aug 2024

DOI：10.1007/s41365-024-01537-8

61702

This study proposes a novel particle-encoding mechanism that seamlessly incorporates the quantum properties of particles, with a specific emphasis on constituent quarks. The primary objective of this mechanism is to facilitate the digital registration and identification of a wide range of particle information. Its design ensures easy integration with different event generators and digital simulations commonly used in high-energy experiments. Moreover, this innovative framework can be easily expanded to encode complex multi-quark states comprising up to nine valence quarks and accommodating an angular momentum of up to 99/2. This versatility and scalability make it a valuable tool.

Multi-quark stateEncoding mechanismConstituent quarkParticle physics

introduction

With the continuous development of high-energy heavy-ion collision experiments, an increasing number of new particles has been identified. The experimental characteristics of these particles, including mass, angular momentum, spin, and symmetry, are measured with increasing accuracy. Every year, the Particle Data Group (PDG), operating at the Lawrence Berkeley Laboratory, in collaboration with the International Organization for Particle Physics Cooperation, releases updated electronic versions of the Review of Particle Physics. These comprehensive reviews have typically been published in prominent international journals during even-numbered years [1-4]. They provide detailed experimental data on various leptons, mesons, and baryons, along with their mass, angular momentum, symmetry, isospin, and other properties, such as full width and decay modes.

Initially, when the number of particles was limited, a simplistic classification using a few letters was often employed. Later, it was further subdivided based on quantum numbers such as isospin and angular momentum. However, with the continuous advancement of experimental technology, an increasing number of new peaks in the mass spectrum have been identified as new particles that share similar quantum properties. Consequently, it is necessary to add the mass of each particle to distinguish between them. For instance, π, π(1300), π(1800), π(2070), ⋯, a₁(1260), a₁(1640), a₁(2096), a₁(2270), ⋯ have been newly identified [5, 6]. In computer simulation research on these experiments, it is necessary to assign a unique identification code to each particle. The concept of particle encoding was introduced by Yost et al. in 1988 [7], with significant revisions implemented in 1998 [8]. However, over the past two decades, the identification of newly discovered particles has been required. It has become evident that the approach of adding mass to identify particles is not sufficient for encoding, because different excited states with the same quark composition require different encoding. Experimental measurements that are considered a mixture of several possible particles also require separate encoding. However, in various simulation transport models, the excited states of a given particle with the same constituent quarks are often coded by program developers in a simple sequence based on their increasing mass trend, such as π⁰-111, π(1300)⁰-100111, π(1800)⁰-9010111, π(2070)⁰-? [9], which lacks universality and sustainability.

In particular, the encoding of multi-quark states has become an urgent issue. In experiments, exotic states, in particular some four-quark and five-quark states (X(3872) [10], Zc(3900) [11], Zc(4020)^± [12, 13], X₁(2900) [14], $T_{c c}^{+}$ [15] etc.), have been discovered in the past 20 years. The fundamental theory of strong interaction, i.e., quantum chromodynamics (QCD), does not prohibit the existence of multi-quark states if they satisfy $q^{m} {\bar{q}}^{n}, m - n = 3 k (k = 0, 1,2, \dots)$ [16]. Therefore, more exotic states are expected to be explored in the future. Efforts have been made to unify naming conventions for exotic hadrons [17]. The existing encoding mechanisms cannot encode these particles, which poses a challenge for current computer simulations when dealing with multi-quark states [18]. However, this cannot be solved by simply adding encoding bits. Therefore, a novel particle encoding mechanism is required.

This study proposes a durable and rational encoding mechanism to unify the treatment of normal and exotic hadrons. This mechanism may serve for an extensive period of time in the future. The remainder of this paper is organized as follows. In Sect. 2, we go over the naming rules in PDG data. Section 3 explains the proposed encoding mechanism. Section 4 explains the encoding of some common particles according to the proposed encoding mechanism. Finally, a summary is presented in Sect. 5.

Particle naming rules from PDG

The particle information disseminated annually by the PDG, which reflects up-to-date experimental confirmations, adheres to specific classification rules and nomenclature that can be summarized as follows:

1. Quarks and leptons are predominantly denoted by the initial letter of their names. A few exceptions to this rule are due to convention, e.g., the photon is denoted by the symbol γ.

2. Non-strange light mesons, characterized with zero net strangeness and heavy flavor quantum numbers (i.e., S = C = B = 0), are typically represented by lowercase letters, such as π, ρ, ω, η, ϕ, a, f, b, h. They are further divided into two subgroups based on their spin angular momentum S: $\begin{matrix} S = 0 : π, η, b, h \\ S = 1 : ρ, ω, ϕ, a, f \end{matrix}$ In each subgroup, the total angular momentum of the particle is marked with a subscript, such as $π_{2}, ϕ_{3}, \dots$ . However, it was observed that there were particles with the same spin and total angular momenta but different masses. To distinguish these particles, their masses, in units of MeV/c², are added in parentheses after the symbol, e.g., π₁(1400), π₁(1600), f₁(1500), f₁(1710). The electric charge is also specified as a superscript. It can be omitted for isospin singlet (I = 0) states where only one charge value is possible for each particle.

3. Other mesons in the form of $q {\bar{q}}^{'}$ are labeled with uppercase letters. Particles with spin 1 are represented by an additional asterisk in the upper right corner to distinguish them from those with spin 0, while the total angular momentum is added in the lower right corner. The charge property of these particles is derived from their internal quark composition.

K Strange light mesons (S=± 1, C=B=0) such as $K^{+} = u \bar{s}, K^{0} = d \bar{s}$ , $\bar{K^{0}} = \bar{d} s, K^{-} = \bar{u} s$ , others $K_{J}^{*}$ similar.

D Charm meson (C=± 1); if there is also S=± 1, it is represented by adding <s>s </s> to the lower right corner of the letter. For example, $D_{s 1}^{* +}$ represents a meson with a strange quark and angular momentum of 1 for the $c \bar{s}$ combination.

B The bottom meson (B=± 1), similar to the charm meson, may also contain strange quarks. Therefore, the subscript may also be labeled as s. For example, $B_{s 2}^{*}$ represents a meson with a strange quark and angular momentum of 2 for the $s \bar{b}$ combination. The bottom meson may also contain charm; therefore, it is marked with the subscript c, e.g., $B_{c}^{+}$ .

4. Heavy quarkonium refers to mesons in the form of $c \bar{c}$ , $b \bar{b}$ combinations. They are represented by ηc, ηb, hc, hb, ψ, χ, Zc, Zb, Υ, etc.

5. Baryons are represented in uppercase letters, except for proton p and neutron n.

(a) Comprising only two types of light quarks, i.e., up and down, they can be divided into N and Δ series based on their isospin, I=1/2, 3/2, respectively.

(b) Containing one strange quark, it can be divided into Λ and ∑ series based on its isospin, I=0,1, respectively.

(d) Baryons containing a charm quark are marked with the subscript c, e.g., Λ_c, ∑_c, Ξ_c, Ω_c, Ξ_cc, Ω_cc.

(e) Baryons containing a bottom quark are marked with the subscript b, e.g., Λ_b, Ξ_b, Ω_b.

6. The four-quark and five-quark states have not yet been listed as a separate category in the 2022 edition of the PDG (and possibly not in the 2024 edition either). In its section “Monte Carlo Particle Numbering Scheme", only two codes of pentaquarks are listed. A naming method is proposed in Ref. [17] that uses T and P as the main names, supplemented by superscripts and subscripts, to indicate the composition and quantum properties of the corresponding particle. Mass, in units of MeV/c², must be added in parentheses, and the charge superscript must also be added where is appropriate. For particles with certain information, this naming method is applied in the following context.

In the transport simulation of high-energy elementary particle collisions and nuclear collisions, it is necessary to convert the aforementioned naming rules into numerical encoding. On the one hand, it is convenient to identify a large number of particles coexisting in the collision system; on the other hand, it is necessary to enable the program to read diverse information about the corresponding particles from their encoding.

Novel particle encoding scheme

In the proposed particle-encoding mechanism, we focus on constituent quarks by expanding the information content. However, we preserve the original encoding ideas as much as possible to make our encoding scheme easy to implement. These ideas have been adopted in most event generators and transport simulation programs, such as PYTHIA [19] and PACIAE [20]. Numbers below 100 are reserved for special purposes, same as the existing encoding approaches [19, 20].

1. Numbers 1–10 are assigned to quarks whereas numbers 11–20 are assigned to leptons. There are also numbers reserved for possible fourth- and fifth-generation quarks and leptons beyond the Standard Model (see Table 1). Their corresponding anti-particles are identified with corresponding negative numbers.

Particle encoding in the Standard Model

Name	Code	Name	Code	Name	Code	Name	Code
d	1	e^-	11	g	21	$h^{0} / H_{1}^{0}$	31
u	2	νe	12	γ	22	$Z^{'} / Z_{2}^{0}$	32
s	3	μ^-	13	Z⁰	23	${Z^{'}}^{'} / Z_{3}^{0}$	33
c	4	νμ	14	W⁺	24	$W^{'} / W_{2}^{+}$	34
b	5	τ^-	15	G	25	$H^{0} / H_{2}^{0}$	35
t	6	ντ	16			$A^{0} / H_{3}^{0}$	36
b’	7	τ’^-	17			H⁺	37
t’	8	ντ’	18

2. Two-digit numbers in the range 21-30 are assigned to gauge bosons and Higgs in the Standard Model (see Table 1).

3. The boson content of a two-Higgs-doublet scenario and that of additional SU(2) × U(1) groups are assigned to the range 31-40.

4. “One-of-a-kind” exotic particles are assigned numbers in the range 41-80.

5. The numbers 81-100 are reserved for generator-specific pseudoparticles and concepts.

6. In principle, di-quark states can also be fully encoded using the proposed encoding mechanism. Without considering their excited states, a simple four-digit code can represent their two different spin combinations. The first two digits are the flavor codes of the quarks with larger absolute value ranking first. The third digit is ‘0’, whereas the last digit is ‘1’ or ‘3’, representing their corresponding spin as ‘0’ or ‘1’, i.e., a simple code for the di-quark state will be in the form of qq’01 or qq’03, such as “3201" (us quark combination with spin 0).

The other composite particles are encoded based on the information of their component quarks, including the total number of quarks, number of positive quarks, quark composition, total spin, total angular momentum, isospin, radial quantum number, orbital quantum number, and three types of symmetry, namely G parity, parity, and charge conjugation (GPC), represented by P₃. The general form of the particle encoding is a string of numbers: $N n q_{N} \dots q_{N - n + 1} \dots q_{1} n_{s} n_{J} n_{I} n_{r} n_{L} P_{3} .$ Figure 1 represents this encoding.

Fig. 1

encoding diagram

The total number of digits in the particle code is N+9. Specific details are as follows:

1. The first number, ‘N’, represents the total number of constituent quarks in the particle (the proposed encoding mechanism is able to encode particles composed of up to nine quarks, and this can be easily extended to particles with more than nine quarks, which are not expected to be discovered for now). The second number, ‘n’, indicates the number of positive quarks in it. The following N-digit numbers are used to specify the component quarks; they are arranged as follows:

(a) The n positive quarks are ranked first in descending order using the quark number code listed in Table 1, while the N-n anti-quarks are ranked in descending order of their absolute values after the positive quarks.

(b) The distinction between positive and negative particles is no longer defined according to the sign before the particle code. It depends on the summation of the charges of the constituent quarks. Thus, the PDG convention for positive or negative particles is maintained. The encoding of the antiparticle of a given particle is assigned by adding a negative sign before its code, i.e., a negative sign indicates an operation in which, if a negative sign is added before the code, all the constituent quarks require their anti-quark code according to the following expression: $\begin{matrix} - N n q_{N} \dots q_{N - n + 1} \dots q_{1} n_{s} \dots \\ = N (N - n) q_{N - n} \dots q_{1} q_{N} \dots q_{N - n + 1} n_{s} \dots \end{matrix}$ (1) Thus, it is straightforward to encode the particles in event generators and transport simulation programs once the constituent quarks are known. This does not require the knowledge whether it is a particle or an anti-particle.

2. The spin information of the particle is placed next to the quark composition and only requires one digit. Therefore, the total spin 2S+1 should not exceed 9, which leads to $S \leq 4$ . Thus, only particles with a total spin less than or equal to 4 can be encoded; still, it is sufficiently large for practical encoding.

3. The total angular momentum quantum number is in units of 1/2. Therefore, the total quantum number of the angular momentum of a particle with code J is $J \times \frac{1}{2}$ . To consider high-angular-momentum particles, this information is represented by two digits, and the maximum total angular momentum can be encoded as 99/2.

4. The isospin quantum number, also measured in units of 1/2, only requires one digit.

5. n_r is used to label the radial quantum number for the excited states of particles. The radial quantum number is 1, 2, L.

6. The orbital quantum number n_L takes values of 0, 1, 2, 3, …, corresponding to S,P,D,F,…, respectively. Both n_r and n_L require a single digit.

7. The last digit, P₃, represents a binary code composed of three symmetric combinations of GPC, which is converted back to decimal representation. Each symmetry is represented by ‘0’ and ‘1’ as ‘-’ and ‘+’, respectively. Items without symmetry are also represented by ‘0’. For example, the combination of GPC symmetry ‘+-+’ is represented by the number ‘5’.

Particle encoding examples

According to the constituent quark model [21], the quantum numbers of the total angular momentum J, parity P, and charge-conjugation parity C (for charge-neutral states) of a meson ( $q \bar{q}$ system) are given by $\begin{matrix} J = L + S, & P = {(-)}^{L + 1}, & C = {(-)}^{L + S}, \end{matrix}$ (2) where L is the relative orbital angular momentum between q and $\bar{q}$ and S is the total spin. Thus, all possible JPCs can be expressed as listed in Table 2. Combinations JPC=0^–,0^+-,1^-+,2^+- are not allowed in conventional $q \bar{q}$ systems [22]. In other words, they are exotic states with these quantum numbers. For example, π₁(1400), π₁(1600), π₁(2015), and η₁ with JPC=1^-+ have been measured experimentally. Some studies suggested that these may be tetraquarks [23]. For convenience, we list the codes of some common particles in the proposed encoding mechanism, most of which have been discovered experimentally. The names of the particles (column ‘notation’ in the tables) and the corresponding information of the isospin, angular momentum, parity, etc. (columns IG(JPC) in the tables) were taken from PDG [4]. The information in the n^2S+1Lj column was mostly obtained from the literature (Refs. [24, 25] for light mesons mainly), while the question mark ‘?’ in column ‘Ref.’ indicates some uncertainty. If a question mark is immediately followed by a number or symbol, then this number or symbol is a possible speculation about the value represented by the question mark.

JPC that the

q \bar{q}

system allows (up to D-wave)

L	S	JPC	L	S	JPC	L	S	JPC
0	0	0^-+	1	0	1^+-	2	0	2^-+
0	1	1^––	1	1	0⁺⁺	2	1	1^––
			1	1	1⁺⁺	2	1	2^––
			1	1	2⁺⁺	2	1	3^––

Table 3 summarizes the particle codes for light mesons. Note that the quark combination $d \bar{d}$ represents a mixed state of $u \bar{u}$ and $d \bar{d}$ $\frac{1}{\sqrt{2}} (u \bar{u} + d \bar{d}) .$ Table 4 lists the codes for some strange, charmed bottom mesons and heavy quarkonium. For two particle states with the same quantum numbers but different lifetimes, such as $K_{S}^{0}$ and $K_{L}^{0}$ , a strategy of subtracting and adding 1 at the spin bit to distinguish their encodings is applied. This strategy can also be applied to particles which are the two different mass eigenstates, such as $B_{L}^{0}, B_{H}^{0}$ . Different models were used for the excited states of the D and Ds meson series in Refs. [26] and [27], yielding similar computational results. However, there are multiple structural models of heavy quarkonium. For example, Zc(3900) can be assumed to be a hadro-quarkonium, $c \bar{c}$ [28], ${\bar{D}}^{*} D$ molecule [29], or a tetraquark [30]. Because of the increase in charmonium-like states, it was not easy to experimentally determine whether they were hybrid, molecular, or multi-quark states, so they were all represented by X(xxxx), Y(xxxx), Z(xxxx), (where xxxx is the particle mass in units of MeV/c²), collectively referred to as XYZ particles [31]. For instance, X(3823), X(3872), Y(4260), Zc(3900)⋅s, and X(3872) are represented as χ_c1(3872); X(3823) is similar to ψ₂(1³D₂) [17, 32]. However, in computer simulation programs, these particles can have a definite quark composition; therefore, there must be a definite encoding. Table 4 lists the representative particles in the PDG classified into heavy flavor quarkonium classes. The symbols ‘?’ in the table must be verified. Some assignments after ‘?’ are only tentative, that is, they are the best estimates reported so far.

Summary of encoding of light unflavored mesons

notation	$q_{N} \dots q_{1}$	IG(JPC)	n^2S+1Lj	Ref.	code	notation	$q_{N} \dots q_{1}$	IG(JPC)	n^2S+1Lj	Ref.	code
π⁺	$u \bar{d}$	1^-(0^-)	$1^{1} S_{0}$	[24]	21211002101	ρ(770)	$d \bar{d}$	1⁺(1^–)	1³S₁	[24]	21113022104
π^-	$d \bar{u}$	1^-(0^-)	1¹S₀	[24]	21121002101	ω(782)	$u \bar{u}$	0^-(1^–)	1³S₁	[24]	21223020100
π⁰	$d \bar{d}$	1^-(0^-+)	1¹S₀	[24]	21111002101	ϕ(1020)	$s \bar{s}$	0^-(1^–)	1³S₁	[24]	21333020100
η	$u \bar{u}$	0⁺(0^-+)	?¹?₀	?1?S	21221000105	ρ(1450)	$d \bar{d}$	1⁺(1^–)	2³S₁	[24]	21113020204
η’	$s \bar{s}$	0⁺(0^-+)	?¹?₀	?1?S	21331000105	ω(1420)	$u \bar{u}$	0^-(1^–)	2³S₁	[24]	21223020200
π(1300)	$d \bar{d}$	1^-(0^-+)	2¹S₀	[24]	21111002201	ϕ(1680)	$s \bar{s}$	0^-(1^–)	2³S₁	[24]	21333020200
η(1295)	$u \bar{u}$	0⁺(0^-+)	2¹S₀	[24]	21221000205	ρ(1900)	$d \bar{d}$	1⁺(1^–)	3³S₁	[24]	21113020304
η(1475)	$s \bar{s}$	0⁺(0^-+)	2¹S₀	[24]	21331000205	ω(1960)	$u \bar{u}$	0^-(1^–)	3³S₁	[24]	21223020300
π(1800)	$d \bar{d}$	1^-(0^-+)	3¹S₀	[24]	21111002301	ϕ(2170)	$s \bar{s}$	0^-(1^–)	3³S₁	[24]	21333020300
η(1760)	$u \bar{u}$	0⁺(0^-+)	3¹S₀	[24]	21221000305	ρ(2265)	$d \bar{d}$	1⁺(1^–)	4³S₁	[24]	21113020404
η(2100)	$s \bar{s}$	0⁺(0^-+)	3¹S₀	[24]	21331000305	ω(2205)	$u \bar{u}$	0^-(1^–)	4³S₁	[24]	21223020400
π(2070)	$d \bar{d}$	1^-(0^-+)	4¹S₀	[24]	21111002401	ρ(2490?)	$d \bar{d}$	1⁺(1^–)	5³S₁		21113020504
η(2010)	$u \bar{u}$	0⁺(0^-+)	4¹S₀	[24]	21221000405	ω(?)	$u \bar{u}$	0^-(1^–)	5³S₁		21223020500
η(2225)	$s \bar{s}$	0⁺(0^-+)	4¹S₀	?	21331000405	a₀(1450)	$d \bar{d}$	1^-(0⁺⁺)	1³P₀	[24]	21113002113
π(2360)	$d \bar{d}$	1^-(0^-+)	5¹S₀	[24]	21111002501	f₀(1370)	$u \bar{u}$	0⁺(0⁺⁺)	1³P₀	[24]	21223000117
η(2320)	$u \bar{u}$	0⁺(0^-+)	5¹S₀	[24]	21221000505	f₀(1500)	$s \bar{s}$	0⁺(0⁺⁺)	1³P₀	[24]	21333000117
π₂(1670)	$d \bar{d}$	1^-(2^-+)	1¹D₂	[24]	21111042121	a₀(1710?)	$d \bar{d}$	1^-(0⁺⁺)	2³P₀		21113002213
η2(1645)	$u \bar{u}$	0⁺(2^-+)	1¹D₂	[24]	21221040125	f₀(1724)	$u \bar{u}$	0⁺(0⁺⁺)	2³P₀	[24]	21223000217
η2(1870)	$s \bar{s}$	0⁺(2^-+)	1¹D₂	[24]	21331040125	a₀(2025)	$d \bar{d}$	1^-(0⁺⁺)	3³P₀	[24]	21113002313
π₂(1880)	$d \bar{d}$	1^-(2^-+)	2¹D₂	[24]	21111042221	f₀(1992)	$u \bar{u}$	0⁺(0⁺⁺)	3³P₀	[24]	21223000317
η2(2030)	$u \bar{u}$	0⁺(2^-+)	2¹D₂	[24]	21221040225	f₀(2314)	$s \bar{s}$	0⁺(0⁺⁺)	3³P₀	[24]	21333000317
π₂(2245)	$d \bar{d}$	1^-(2^-+)	3¹D₂	[24]	21111042321	a₀(2265?)	$d \bar{d}$	1^-(0⁺⁺)	4³P₀	[24]	21113002413
η2(2248)	$u \bar{u}$	0⁺(2^-+)	3¹D₂	[24]	21221040325	f₀(2189)	$u \bar{u}$	0⁺(0⁺⁺)	4³P₀	[24]	21223022417
b₁(1235)	$d \bar{d}$	1⁺(1^+-)	1¹P₁	[24]	21111022116	ρ(1570)	$d \bar{d}$	1^-(1^–)	1³D₁	[24]	21113022120
h₁(1170)	$u \bar{u}$	0^-(1^+-)	1¹P₁	[24]	21221020112	ω(1670)	$u \bar{u}$	0⁺(1^–)	1³D₁	[24]	21223020124
h₁(1380)	$s \bar{s}$	0^-(1^+-)	1¹P₁	[24]	21331020112	ρ(1909)	$d \bar{d}$	1^-(1^–)	2³D₁	[24]	21113022220
b₁(?)	$d \bar{d}$	1⁺(1^+-)	2¹P₁		21111022216	ω(2290)	$s \bar{s}$	0⁺(1^–)	2³D₁	[24]	21333020224
h₁(1595)	$u \bar{u}$	0^-(1^+-)	2¹P₁		21221020212	ρ(2149)	$d \bar{d}$	1^-(1^–)	3³D₁	[24]	21113022320
h₁(?)	$s \bar{s}$	0^-(1^+-)	2¹P₁		21331020212	ρ₂(?)	$d \bar{d}$	1⁺(2^–)	1³D₂	[24]	21113042124
b₁(1960)	$d \bar{d}$	1⁺(1^+-)	3¹P₁	[24]	21111022316	ω₂(?)	$s \bar{s}$	0^-(2^–)	1³D₂	[24]	21333040120
h₁(1965)	$u \bar{u}$	0^-(1^+-)	3¹P₁	[24]	21221020312	ρ₂(1940)	$d \bar{d}$	1⁺(2^–)	2³D₂	[24]	21113042224
b₁(2240)	$d \bar{d}$	1⁺(1^+-)	4¹P₁	[24]	21111022416	ω₂(1975)	$u \bar{u}$	0^-(2^–)	2³D₂	[24]	21223040220
h₁(2215)	$u \bar{u}$	0^-(1^+-)	4¹P₁	[24]	21221020412	ρ₂(2225)	$d \bar{d}$	1⁺(2^–)	3³D₂	[24]	21113042324
b₁(?)	$d \bar{d}$	1⁺(1^+-)	5¹P₁		21111022516	ω₂(2195)	$u \bar{u}$	0^-(2^–)	3³D₂	[24]	21223040320
h₁(?)	$u \bar{u}$	0^-(1^+-)	5¹P₁		21221020512	a₂(1320)	$d \bar{d}$	1^-(2⁺⁺)	1³P₂	[24]	21113042113
ρ₃(1690)	$d \bar{d}$	1^-(3^–)	1³D₃	[24]	21113062120	f₂(1270)	$u \bar{u}$	0⁺(2⁺⁺)	1³P₂	[24]	21223040117
ω₃(1667)	$u \bar{u}$	0⁺(3^–)	1³D₃	[24]	21223060124	f’₂(1525)	$s \bar{s}$	0⁺(2⁺⁺)	1³P₂	[24]	21333040117
ϕ₃(1854)	$s \bar{s}$	0⁺(3^–)	1³D₃	[24]	21333060124	a₂(1700)	$d \bar{d}$	1^-(2⁺⁺)	2³P₂	[24]	21113042213
ρ₃(2066?)	$d \bar{d}$	1^-(3^–)	2³D₃	[24]	21113062220	f₂(1755)	$u \bar{u}$	0⁺(2⁺⁺)	2³P₂	[24]	21223040217
ω₃(2338?)	$s \bar{s}$	0⁺(3^–)	2³D₃	[24]	21333060224	f₂(2010)	$s \bar{s}$	0⁺(2⁺⁺)	2³P₂	[24]	21333040217
ρ₃(2300)	$d \bar{d}$	1^-(3^–)	3³D₃	[24]	21113062320	a₂(2050)	$d \bar{d}$	1^-(2⁺⁺)	3³P₂	[24]	21113042313
ω₃(2278)	$u \bar{u}$	0⁺(3^–)	3³D₃	[24]	21223060324	f₂(2001)	$u \bar{u}$	0⁺(2⁺⁺)	3³P₂	[24]	21223040317
a₁(1260)	$d \bar{d}$	1^-(1⁺⁺)	1³P₁	[24]	21113022113	f₂(2300)	$s \bar{s}$	0⁺(2⁺⁺)	3³P₂	[24]	21333040317
f₁(1285)	$u \bar{u}$	0⁺(1⁺⁺)	1³P₁	[24]	21223020117	a₂(2280)	$d \bar{d}$	1^-(2⁺⁺)	4³P₂	[24]	21113042413
f₁(1420)	$s \bar{s}$	0⁺(1⁺⁺)	1³P₁	[24]	21333020117	f₂(2300)	$u \bar{u}$	0⁺(2⁺⁺)	4³P₂	[24]	21223040417
a₁(1640)	$d \bar{d}$	1^-(1⁺⁺)	2³P₁	[24]	21113022213	a₂(1797?)	$d \bar{d}$	1^-(2⁺⁺)	1³F₂	[24]	21113042133
f₁(?)	$u \bar{u}$	0⁺(1⁺⁺)	2³P₁	[24]	21223020217	f₂(1815)	$u \bar{u}$	0⁺(2⁺⁺)	1³F₂	[24]	21223040137
f₁(1971)	$s \bar{s}$	0⁺(1⁺⁺)	2³P₁	[24]	21333020217	f₂(2156)	$s \bar{s}$	0⁺(2⁺⁺)	1³F₂	[24]	21333040137
a₁(2096)	$d \bar{d}$	1^-(1⁺⁺)	3³P₁	[24]	21113022313	a₂(2100)	$d \bar{d}$	1^-(2⁺⁺)	2³F₂	[24]	21113042233
f₁(?)	$u \bar{u}$	0⁺(1⁺⁺)	3³P₁		21223020317	f₂(2141)	$u \bar{u}$	0⁺(2⁺⁺)	2³F₂	[24]	21223040237
a₁(2270)	$d \bar{d}$	1^-(1⁺⁺)	4³P₁	[24]	21113022413	f₁(2310)	$u \bar{u}$	0⁺(1⁺⁺)	4³P₁	[24]	21223020417

Summary of encoding of strange, charm, bottom mesons and quarkoniums

notation	$q_{N} \dots q_{1}$	IG(JPC)	n^2S+1Lj	Ref.	code	notation	$q_{N} \dots q_{1}$	IG(JPC)	n^2S+1Lj	Ref.	code
strange mesons						bottom mesons
K⁺494)	$u \bar{s}$	$\frac{1}{2} (0^{-})$	1¹S₀	[25]	21231001100	B⁺	$u \bar{b}$	$\frac{1}{2} (0^{-})$	1¹S₀	[26]	21251001100
K^-(494)	$s \bar{u}$	$\frac{1}{2} (0^{-})$	1¹S₀	[25]	21321001100	B^-	$b \bar{u}$	$\frac{1}{2} (0^{-})$	1¹S₀	[26]	21521001100
K⁰498)	$d \bar{s}$	$\frac{1}{2} (0^{-})$	1¹S₀	[25]	21131001100	B⁰	$d \bar{b}$	$\frac{1}{2} (0^{-})$	1¹S₀	[26]	21151001100
$\bar{K^{0}} (498)$	$s \bar{d}$	$\frac{1}{2} (0^{-})$	1¹S₀	[25]	21311001100	$\bar{B^{0}}$	$b \bar{d}$	$\frac{1}{2} (0^{-})$	1¹S₀	[26]	21511001100
$K_{S}^{0} (498)$	$d \bar{s}$	$\frac{1}{2} (0^{-})$	1¹S₀	[25]	21130001100	$B_{L}^{0}$	$d \bar{b}$	$\frac{1}{2} (0^{-})$	1¹S₀	[26]	21150001100
$K_{L}^{0} (498)$	$d \bar{s}$	$\frac{1}{2} (0^{-})$	1¹S₀	[25]	21132001100	$B_{H}^{0}$	$d \bar{b}$	$\frac{1}{2} (0^{-})$	1¹S₀	[26]	21152001100
K^*+892)	$u \bar{s}$	$\frac{1}{2} (0^{-})$	1³S₁	[25]	21233021100	B^*+	$u \bar{b}$	$\frac{1}{2} (0^{-})$	1³S₁	[26]	21253021100
K^*0896)	$d \bar{s}$	$\frac{1}{2} (0^{-})$	1³S₁	[25]	21133021100	B^*0	$d \bar{b}$	$\frac{1}{2} (0^{-})$	1³S₁	[26]	21153021100
$K_{0}^{* +} (1425)$	$u \bar{s}$	$\frac{1}{2} (0^{+})$	1³P₀	[25]	21233001112	B₁(5721)⁺	$u \bar{b}$	$\frac{1}{2} (1^{+})$	1¹P₁	[26]	21251021112
$K_{0}^{* 0} (1425)$	$d \bar{s}$	$\frac{1}{2} (0^{+})$	1³P₀	[25]	21133001112	B₁(5721)⁰	$d \bar{b}$	$\frac{1}{2} (1^{+})$	1¹P₁	[26]	21121021112
$K_{2}^{* +} (1426)$	$u \bar{s}$	$\frac{1}{2} (2^{+})$	1³P₂	[25]	21233041112	$B_{2}^{*} {(5747)}^{+}$	$u \bar{b}$	$\frac{1}{2} (2^{+})$	1³P₂	[26]	21253041112
$K_{2}^{* 0} (1432)$	$d \bar{s}$	$\frac{1}{2} (2^{+})$	1³P₂	[25]	21133041112	$B_{2}^{*} {(5747)}^{0}$	$d \bar{b}$	$\frac{1}{2} (2^{+})$	1³P₂	[26]	21153041112
K^*+1680)	$u \bar{s}$	$\frac{1}{2} (1^{-})$	1³D₁	[25]	21233041112	$B_{s}^{0}$	$s \bar{b}$	0(0^-)	1¹S₀	[26]	21351000100
K^*01718)	$d \bar{s}$	$\frac{1}{2} (1^{-})$	1³D₁	[25]	21133041112	$B_{s}^{*}$	$s \bar{b}$	0(1^-)	1³S₁	[26]	21353020100
$K_{3}^{* +} (1776)$	$u \bar{s}$	$\frac{1}{2} (3^{-})$	1³D₃	[25]	21233021120	$\bar{B_{s}^{*}}$	$b \bar{s}$	0(1^-)	1³S₁	[26]	21533020100
$K_{3}^{* 0} (1780)$	$d \bar{s}$	$\frac{1}{2} (3^{-})$	1³D₃	[25]	21133021120	B_s1(5830)⁰	$s \bar{b}$	0(1⁺)	1¹P₁	[26]	21351020112
$K_{4}^{* 0} (2045)$	$d \bar{s}$	$\frac{1}{2} (4^{+})$	1³F₄	[25]	21233061120	$B_{s 2}^{*} (5840)$	$s \bar{b}$	0(2⁺)	1³P₂	[26]	21353040112
$K_{5}^{* +} (2380)$	$u \bar{s}$	$\frac{1}{2} (5^{-})$	1³G₅	[25]	21233101140	$B_{c}^{+}$	$c \bar{b}$	0(0^-)	1¹S₀	[26]	21451000100
$K_{5}^{* 0} (2380)$	$d \bar{s}$	$\frac{1}{2} (5^{-})$	1³G₅	[25]	21133101140	$B_{c}^{-}$	$b \bar{c}$	0(0^-)	1¹S₀	[26]	21541000100
K^*+1410)	$u \bar{s}$	$\frac{1}{2} (1^{-})$	2³S₁	[25]	21233021200	heavy quarkonium
K^*01410)	$d \bar{s}$	$\frac{1}{2} (1^{-})$	2³S₁	[25]	21133021200	ηc	$c \bar{c}$	0⁺(0^-+)	1¹S₀	[27]	21441000105
$K_{0}^{* +} (1950)$	$u \bar{s}$	$\frac{1}{2} (0^{+})$	2³P₀	[25]	21233001212	ηc(2S)	$c \bar{c}$	0⁺(0^-+)	2¹S₀	[27]	21441000205
$K_{0}^{* 0} (1950)$	$d \bar{s}$	$\frac{1}{2} (0^{+})$	2³P₀	[25]	21133001212	hc(1P)	$c \bar{c}$	0^-(1^+-)	1¹P₁	[27]	21441020114
charmed mesons						J/ψ	$c \bar{c}$	0^-(1^–)	1¹S₀	[27]	21441000100
D⁺	$c \bar{d}$	$\frac{1}{2} (0^{-})$	1¹S₀	[28]	21411001100	χ_c0(1P)	$c \bar{c}$	0⁺(0⁺⁺)	1¹P₀	[29]	21441000117
D^-	$d \bar{c}$	$\frac{1}{2} (0^{-})$	1¹S₀	[28]	21141001100	χ_c1(1P)	$c \bar{c}$	0⁺(1⁺⁺)	1¹P₁	[29]	21441020117
D⁰	$c \bar{u}$	$\frac{1}{2} (0^{-})$	1¹S₀	[28]	21421001100	χ_c2(1P)	$c \bar{c}$	0⁺(2⁺⁺)	1¹P₁	[29]	21441040117
$\bar{D^{0}}$	$u \bar{c}$	$\frac{1}{2} (0^{-})$	1¹S₀	[28]	21241001100	χ_c1(3872)	$c \bar{c}$	0⁺(1⁺⁺)	2¹P₁	[29]	21441020217
D^*(2007)⁰	$c \bar{u}$	$\frac{1}{2} (1^{-})$	1³S₁	[30]	21423021100	χ_c2(3930)	$c \bar{c}$	0⁺(2⁺⁺)	2¹P₂	[29]	21441040217
$D_{0}^{*} {(2300)}^{0}$	$c \bar{u}$	$\frac{1}{2} (0^{+})$	1³P₀	[30]	21423001112	ψ(2S)	$c \bar{c}$	0^-(1^–)	2¹S₁	[29]	21441020200
D₁(2420)⁰	$c \bar{u}$	$\frac{1}{2} (1^{+})$	1¹S₁	?	21421021102	ψ(3770)	$c \bar{c}$	0^-(1^–)	1³D₁	[29]	21443020120
D₁(2430)⁰	$c \bar{u}$	$\frac{1}{2} (1^{+})$	1¹P₁	?	21421021112	ψ₂(3823)	$c \bar{c}$	0^-(2^–)	1³D₂	[31]	21443040120
$D_{2}^{*} {(2460)}^{0}$	$c \bar{u}$	$\frac{1}{2} (2^{+})$	1³P₂	[30]	21423041112	Zc(3900)	$c \bar{c}$	1⁺(1^+-)	?^??₁	[32]	2144?020??6
D₀(2550)⁰	$c \bar{u}$	$\frac{1}{2} (0^{-})$	2¹S₀	[30]	21421001200	ηb(1S)	$b \bar{b}$	0⁺(0^-+)	1¹S₀	[32]	21551000105
$D_{1}^{*} {(2600)}^{0}$	$c \bar{u}$	$\frac{1}{2} (1^{-})$	2³S₁	[30]	21423021200	$Υ (1 S)$	$b \bar{b}$	0^-(1^–)	1³S₁	[32]	21553020100
$D_{2} {(2740)}^{0}$	$c \bar{u}$	$\frac{1}{2} (1^{-})$	1³D₂	[30]	21423041120	χ_b0(1P)	$b \bar{b}$	0⁺(0⁺⁺)	1³P₀	[32]	21553000117
$D_{3}^{*} {(2750)}^{0}$	$c \bar{u}$	$\frac{1}{2} (3^{-})$	1³D₃	[30]	21423061120	χ_b1(1P)	$b \bar{b}$	0⁺(1⁺⁺)	1³P₁	[32]	21553020117
$D_{s}^{+}$	$c \bar{s}$	0(0^-)	1¹S₀	[30]	21431000100	χ_b2(1P)	$b \bar{b}$	0⁺(2⁺⁺)	1³P₂	[32]	21553040117
$D_{s}^{-}$	$s \bar{c}$	0(0^-)	1¹S₀	[30]	21341000100	$ϒ (2 S)$	$b \bar{b}$	0^-(1^–)	2³S₁	[32]	21553020200
$D_{s}^{* +}$	$c \bar{s}$	0(1^-)	1³S₁	[30]	21433020100	$ϒ_{2} (1 D)$	$b \bar{b}$	0^-(2^–)	1³D₂	[32]	21553040120
$D_{s}^{* -}$	$s \bar{c}$	0(1^-)	1³S₁	[30]	21343020100	χ_b0(2P)	$b \bar{b}$	0⁺(0⁺⁺)	2³P₀	[32]	21553000217
$D_{s 0}^{*} {(2317)}^{+}$	$c \bar{s}$	0(0⁺)	1³P₀	[30]	21433000112	χ_b1(2P)	$b \bar{b}$	0⁺(1⁺⁺)	2³P₁	[32]	21553020217
$D_{s 0}^{*} {(2317)}^{-}$	$s \bar{c}$	0(0⁺)	1³P₀	[30]	21343000112	χ_b2(2P)	$b \bar{b}$	0⁺(2⁺⁺)	2³P₂	[32]	21553040217
D_s1(2460)⁺	$c \bar{s}$	0(1⁺)	1¹P₁	[30]	21431020112	$ϒ (3 S)$	$b \bar{b}$	0^-(1^–)	3³S₁	[32]	21553020300
D_s1(2460)^-	$s \bar{c}$	0(1⁺)	1¹P₁	[30]	21341020112	$ϒ (4 S)$	$b \bar{b}$	0^-(1^–)	4³S₁	[32]	21553020400
$D_{s 2}^{*} {(2573)}^{+}$	$c \bar{s}$	0(2⁺)	1³P₂	[30]	21433040112	χ_b1(3P)	$b \bar{b}$	0⁺(1⁺⁺)	3³P₁	[32]	21551020317
$D_{s 2}^{*} {(2573)}^{-}$	$s \bar{c}$	0(2⁺)	1³P₂	[30]	21343040112	Zb(10610)	$b \bar{b}$	1⁺(1^+-)	?^??₁	?	2155?020??6
$D_{s 1}^{*} {(2700)}^{+}$	$c \bar{s}$	0(1^-)	2³S₁	[30]	21433020200	$ϒ (10860)$	$b \bar{b}$	0^-(1^–)	?^??₁	?	2155?020??0
$D_{s 1}^{*} {(2700)}^{-}$	$s \bar{c}$	0(1^-)	2³S₁	[30]	21343020200	$ϒ (11020)$	$b \bar{b}$	0^-(1^–)	?^??₁	?	2155?020??0

Table 5 lists the particle codes for certain baryons. The name, isospin, total angular momentum, and symmetry information of these particles were obtained from Ref. [4], whereas the radial and orbital quantum numbers were mostly obtained from theoretical calculations of the hypercentral Constituent Quark Model (hCQM) [38]. In hCQM, the three-body interaction of quarks inside a baryon is described in the form of the Jacobi coordinates ρ and λ, which are combinations of the inter-quark distance ri, $\begin{array}{l} ρ = \frac{1}{\sqrt{2}} (r_{1} - r_{2}), \\ λ = \frac{1}{\sqrt{6}} (r_{1} + r_{2} - 2 r_{3}), \end{array}$ and ultimately reduces to the hyperradius x and hyperangle ξ, $x = \sqrt{ρ^{2} + λ^{2}}, ξ = \arctan \frac{ρ}{λ} .$ The total wave function can be expressed as ρ-and λ-type harmonic oscillators, which can provide radial and orbital quantum numbers. The values of n and L in the tables were mostly derived from calculations reported in the literature, which are listed in column ‘Ref.’. Some entries marked with “?" indicate that the values are indeterminate. However, this does not affect the proposed encoding mechanism, because the code can be encoded with temporary values until the final confirmation. Different charge states caused by different u and d components are also omitted from the table.

Summary of baryon encoding

notation	$q_{N} \dots q_{1}$	IG(JPC)	n^2S+1Lj	Ref.	code	notation	$q_{N} \dots q_{1}$	IG(JPC)	n^2S+1Lj	Ref.	code
p	uud	$\frac{1}{2} ({\frac{1}{2}}^{+})$	1²S_1/2	[33]	332212011102	Δ(1232)⁺⁺	uuu	$\frac{3}{2} ({\frac{3}{2}}^{+})$	1⁴S_3/2	[34]	332224033102
n	udd	$\frac{1}{2} ({\frac{1}{2}}^{+})$	1²S_1/2	[33]	332112011102	Δ(1232)^-	ddd	$\frac{3}{2} ({\frac{3}{2}}^{+})$	1⁴S_3/2	[34]	331114033102
N(1440)⁺	uud	$\frac{1}{2} ({\frac{1}{2}}^{+})$	2²S_1/2	[33]	332212011202	Δ(1232)⁺	uud	$\frac{3}{2} ({\frac{3}{2}}^{+})$	1⁴S_3/2	[34]	332214033102
N(1440)⁰	udd	$\frac{1}{2} ({\frac{1}{2}}^{+})$	2²S_1/2	[33]	332112011202	Δ(1232)⁰	udd	$\frac{3}{2} ({\frac{3}{2}}^{+})$	1⁴S_3/2	[34]	332114033102
N(1520)⁺	uud	$\frac{1}{2} ({\frac{3}{2}}^{-})$	1²P_3/2	[33]	332212031110	Δ(1600)⁺	uud	$\frac{3}{2} ({\frac{3}{2}}^{+})$	2⁴S_3/2	[34]	332214033202
N(1520)⁰	udd	$\frac{1}{2} ({\frac{3}{2}}^{-})$	1²P_3/2	[33]	332112031110	Δ(1600)⁰	udd	$\frac{3}{2} ({\frac{3}{2}}^{+})$	2⁴S_3/2	[34]	332114033202
N(1535)⁺	uud	$\frac{1}{2} ({\frac{1}{2}}^{-})$	1²P_1/2	[33]	332212011110	Δ(1620)⁺	uud	$\frac{3}{2} ({\frac{1}{2}}^{-})$	1²P_1/2	[33]	332212013110
N(1535)⁰	udd	$\frac{1}{2} ({\frac{1}{2}}^{-})$	1²P_1/2	[33]	332112011110	Δ(1620)⁰	udd	$\frac{3}{2} ({\frac{1}{2}}^{-})$	1²P_1/2	[33]	332112013110
N(1650)⁺	uud	$\frac{1}{2} ({\frac{1}{2}}^{-})$	2²P_1/2	[33]	332212011210	Δ(1700)⁺	uud	$\frac{3}{2} ({\frac{3}{2}}^{-})$	1²P_3/2	[33]	332212033110
N(1650)⁰	udd	$\frac{1}{2} ({\frac{1}{2}}^{-})$	2²P_1/2	[33]	332112011210	Δ(1700)⁰	udd	$\frac{3}{2} ({\frac{3}{2}}^{-})$	1²P_3/2	[33]	332112033110
N(1675)⁺	uud	$\frac{1}{2} ({\frac{5}{2}}^{-})$	2²P_5/2	[33]	332212051210	Δ(1900)⁺	uud	$\frac{3}{2} ({\frac{1}{2}}^{-})$	2²P_1/2	[33]	332212013210
N(1675)⁰	udd	$\frac{1}{2} ({\frac{5}{2}}^{-})$	2²P_5/2	[33]	332112051210	Δ(1900)⁰	udd	$\frac{3}{2} ({\frac{1}{2}}^{-})$	2²P_1/2	[33]	332112013210
N(1680)⁺	uud	$\frac{1}{2} ({\frac{5}{2}}^{+})$	1²D_5/2	[35]	332212051122	Δ(1905)⁺	uud	$\frac{1}{2} ({\frac{5}{2}}^{+})$	1⁴D_5/2	[33]	332214053122
N(1680)⁰	udd	$\frac{1}{2} ({\frac{5}{2}}^{+})$	1²D_5/2	[35]	332112051122	Δ(1905)⁰	udd	$\frac{1}{2} ({\frac{5}{2}}^{+})$	1⁴D_5/2	[33]	332114053122
N(1700)⁺	uud	$\frac{1}{2} ({\frac{3}{2}}^{-})$	2²P_3/2	[33]	332212031210	Δ(1910)⁺	uud	$\frac{3}{2} ({\frac{1}{2}}^{+})$	1⁴D_1/2	[33]	332214013122
N(1700)⁰	udd	$\frac{1}{2} ({\frac{3}{2}}^{-})$	2²P_3/2	[33]	332112031210	Δ(1910)⁰	udd	$\frac{3}{2} ({\frac{1}{2}}^{+})$	1⁴D_1/2	[33]	332114013122
N(1710)⁺	uud	$\frac{1}{2} ({\frac{1}{2}}^{+})$	3²S_1/2	[33]	332212011302	Δ(1920)⁺	uud	$\frac{3}{2} ({\frac{3}{2}}^{+})$	1⁴D_3/2	[33]	332212033122
N(1710)⁰	udd	$\frac{1}{2} ({\frac{1}{2}}^{+})$	3²S_1/2	[33]	332112011302	Δ(1920)⁰	udd	$\frac{3}{2} ({\frac{3}{2}}^{+})$	1⁴D_3/2	[33]	332112033122
N(1720)⁺	uud	$\frac{1}{2} ({\frac{3}{2}}^{+})$	3²P_3/2	[33]	332212031312	Δ(1930)⁺	uud	$\frac{3}{2} ({\frac{5}{2}}^{-})$	2⁴P_5/2	[33]	332214053210
N(1720)⁰	udd	$\frac{1}{2} ({\frac{3}{2}}^{+})$	3²P_3/2	[33]	332112031312	Δ(1930)⁰	udd	$\frac{3}{2} ({\frac{5}{2}}^{-})$	2⁴P_5/2	[33]	332114053210
N(1875)⁺	uud	$\frac{1}{2} ({\frac{3}{2}}^{-})$	2²P_3/2	?	332212031210	Δ(1950)⁺	uud	$\frac{3}{2} ({\frac{7}{2}}^{+})$	1⁴D_7/2	[33]	332214073122
N(1875)⁰	udd	$\frac{1}{2} ({\frac{3}{2}}^{-})$	2²P_3/2	[36]	332112031210	Δ(1950)⁰	udd	$\frac{3}{2} ({\frac{7}{2}}^{+})$	1⁴D_7/2	[33]	332114073122
N(1880)⁺	uud	$\frac{1}{2} ({\frac{1}{2}}^{+})$	1²D_1/2	[36]	332212011122	Δ(2200)⁺	uud	$\frac{3}{2} ({\frac{7}{2}}^{-})$	1²F_7/2	[33]	332214073130
N(1880)⁰	udd	$\frac{1}{2} ({\frac{1}{2}}^{+})$	1²D_1/2	[36]	332112011122	Δ(2200)⁰	udd	$\frac{3}{2} ({\frac{7}{2}}^{-})$	1²F_7/2	[33]	332114113130
N(1895)⁺	uud	$\frac{1}{2} ({\frac{1}{2}}^{-})$	2²P_1/2	[36]	332212011210	Δ(2420)⁺	uud	$\frac{3}{2} ({\frac{11}{2}}^{+})$	1⁴G_11/2	?	?
N(1895)⁰	udd	$\frac{1}{2} ({\frac{1}{2}}^{-})$	2²P_1/2	[36]	332112011210	Δ(2420)⁰	udd	$\frac{3}{2} ({\frac{11}{2}}^{+})$	1⁴G_11/2	?	?
N(1900)⁺	uud	$\frac{1}{2} ({\frac{3}{2}}^{+})$	1²P_3/2	[36]	332212031112	Λ(1116)	sud	$0 ({\frac{1}{2}}^{+})$	1²S_1/2	[37]	333212010102
N(1900)⁰	udd	$\frac{1}{2} ({\frac{3}{2}}^{+})$	1²P_3/2	[36]	332112031112	Λ(1405)	sud	$0 ({\frac{1}{2}}^{-})$	?²?_1/2	?	?
N(2060)⁺	uud	$\frac{1}{2} ({\frac{5}{2}}^{-})$	2²P_5/2	[36]	332212051220	Λ(1520)	sud	$0 ({\frac{3}{2}}^{-})$	1²P_3/2	[37]	333212030110
N(2060)⁰	udd	$\frac{1}{2} ({\frac{5}{2}}^{-})$	2²P_5/2	[36]	332112051220	Λ(1600)	sud	$0 ({\frac{1}{2}}^{+})$	2²S_1/2	[37]	333212010202
N(2100)⁺	uud	$\frac{1}{2} ({\frac{1}{2}}^{+})$	4²S_1/2	[36]	332212011402	Λ(1670)	sud	$0 ({\frac{1}{2}}^{-})$	1²P_1/2	[37]	333212010110
N(2100)⁰	udd	$\frac{1}{2} ({\frac{1}{2}}^{+})$	4²S_1/2	[36]	332112011402	Λ(1690)	sud	$0 ({\frac{3}{2}}^{-})$	2²P_3/2	[37]	333212030210
N(2120)⁺	sud	$\frac{1}{2} ({\frac{3}{2}}^{-})$	?^??_3/2	?	?	Λ(1800)	sud	$0 ({\frac{1}{2}}^{-})$	2²P_1/2	[37]	333212010210
N(2120)⁰	sud	$\frac{1}{2} ({\frac{3}{2}}^{-})$	?^??_3/2	?	?	Λ(1820)	sud	$0 ({\frac{5}{2}}^{+})$	1²D_5/2	[37]	333212050122
N(2190)⁺	sud	$\frac{1}{2} ({\frac{7}{2}}^{-})$	?^??_7/2	?	?	Λ(1830)	sud	$0 ({\frac{5}{2}}^{-})$	2⁴P_5/2	[37]	333214050210
N(2190)⁰	sud	$\frac{1}{2} ({\frac{7}{2}}^{-})$	?^??_7/2	?	?	⋯	⋯	⋯	⋯	⋯	⋯
⋯	⋯	⋯	⋯		⋯	∑⁺	suu	$1 ({\frac{1}{2}}^{+})$	1²S_1/2	[37]	333222012102
Ξ⁰	ssu	$\frac{1}{2} ({\frac{1}{2}}^{+})$	1²S_1/2	[37]	333322011102	∑⁰	sud	$1 ({\frac{1}{2}}^{+})$	1²S_1/2	[37]	333212012102
Ξ^-	ssd	$\frac{1}{2} ({\frac{1}{2}}^{+})$	1²S_1/2	[37]	333312011102	∑^-	sdd	$1 ({\frac{1}{2}}^{+})$	1²S_1/2	[37]	333112012102
Ξ(1530)⁰	ssu	$\frac{1}{2} ({\frac{3}{2}}^{+})$	1²S_3/2	[37]	333322031102	∑(1385)⁺	suu	$1 ({\frac{3}{2}}^{+})$	1²S_3/2	[37]	333222032102
Ξ(1690)⁰	ssu	$\frac{1}{2} ({\frac{?}{2}}^{?})$	?		?	∑(1660)⁰	sud	$1 ({\frac{1}{2}}^{+})$	2²S_1/2	[37]	333212012202
Ξ(1820)⁰	ssu	$\frac{1}{2} ({\frac{3}{2}}^{-})$	1²P_3/2	[37]	333322031110	∑(1670)⁰	sud	$1 ({\frac{3}{2}}^{-})$	1²P_3/2	[37]	333212032110
Ξ(1950)⁰	ssu	$\frac{1}{2} ({\frac{?}{2}}^{?})$	?		?	∑(1750)⁰	sud	$1 ({\frac{1}{2}}^{-})$	1⁴P_1/2	[37]	333214012110
Ξ(2030)⁰	ssu	$\frac{1}{2} ({\frac{?}{2}}^{?})$	?		?	∑(1775)⁰	sud	$1 ({\frac{5}{2}}^{-})$	1⁴P_5/2	[37]	333214052110
⋯	⋯	⋯	⋯		⋯	⋯	⋯	⋯	⋯	⋯	⋯
$Λ_{c}^{+}$	cud	$0 ({\frac{1}{2}}^{+})$	1²S_1/2	[38]	334212010102	Ω^-	sss	$0 ({\frac{3}{2}}^{+})$	1²S_3/2	[39]	333332030102
Λ_c(2595)⁺	cud	$0 ({\frac{1}{2}}^{-})$	1²P_1/2	[38]	334212010110	Ω(2250)^-	sss	$0 ({\frac{5}{2}}^{+})$	1²D_5/2	[39]	333332050122
∑_c(2455)⁺	cud	$1 ({\frac{1}{2}}^{+})$	1²S_1/2	[38]	334212012102	$Ξ_{b}^{0}$	bsu	$\frac{1}{2} ({\frac{1}{2}}^{+})$	1²S_1/2	[38]	335322011102
$Ξ_{c}^{+}$	csu	$\frac{1}{2} ({\frac{1}{2}}^{+})$	1²S_1/2	[38]	334324011112	Ξ’_b(5935)^-	bsd	$\frac{1}{2} ({\frac{1}{2}}^{+})$	1²S_1/2	[38]	335312011102
Ξ_c(2645)⁰	csd	$\frac{1}{2} ({\frac{3}{2}}^{+})$	1⁴S_3/2	[38]	334314031102	$Ω_{b}^{-}$	bss	$0 ({\frac{1}{2}}^{+})$	1²S_1/2	[38]	335332010102
⋯	⋯	⋯	⋯		⋯	⋯	⋯	⋯	⋯	⋯	⋯

In the early days of this scientific field, researchers mainly started with the MIT bag model to study multi-quark states composed of light quarks [54, 55]. In recent years, owing to the experimental discovery of multiple quark states containing heavy quarks, researchers have focused on studying the problems of tetraquarks and pentaquarks containing heavy quarks. Their mass spectra are mainly measured from particle reactions and decay products. In theory, the main approach is to analyze their quark composition through various model calculations. However, there is still extensive research to be conducted on their excited states, including radial and orbital excitations. Correspondingly, the standardization of identification and coding has become urgent. Table 6 lists some codes for possible tetraquarks and pentaquarks based on the proposed particle encoding mechanism. Many questions are still open to be resolved or confirmed based on new experimental data or research results. Moreover, even if the data listed in the table were calculated based on certain models, they may not necessarily be strictly accurate. For example, there are currently many models for particle structures, such as a₀(980), f₀(980), π₁(1400), π₁(1600), and η₁, which must be finished. The particle codes presented in the table were obtained by assuming them to be tetraquarks.

Summary of encoding of multi-quark state candidates

notation	$q_{N} \dots q_{1}$	IG(JPC)	$n^{2 S + 1} L_{j}$	Ref.	code	notation	$q_{N} \dots q_{1}$	IG(JPC)	n^2S+1Lj	Ref.	code
tetraquarks						pentaquarks
a₀(980)	$s d \bar{s} \bar{d}$	1^-(0⁺⁺)	1^??₁	?1?P	4231311022111	$P_{ψ}^{N} {(4312)}^{+}$	$c u u d \bar{c}$	${\frac{1}{2}}^{?} ({\frac{1}{2}}^{-})$	1²S_1/2	[16]	54422142011100
f₀(980)	$s u \bar{s} \bar{u}$	0⁺(0⁺⁺)	1^??₁	?1?P	4232321020115	$P_{ψ}^{N} {(4380)}^{+}$	$c u u d \bar{c}$	${\frac{1}{2}}^{?} ({\frac{3}{2}}^{-})$	1²P_3/2	[16]	54422142031110
π₁(1400)	$u d \bar{u} \bar{d}$	1^-(1^-+)	1^??₁	?1?P	4221211022111	$P_{ψ}^{N} {(4450)}^{+}$	$c u u d \bar{c}$	${\frac{1}{2}}^{?} ({\frac{5}{2}}^{-})$	1⁴P_5/2	[16]	54422144051110
η₁(?)	$u d \bar{u} \bar{d}$	0⁺(1^-+)	1^??₁	?1?P	4221211020115	$P_{ψ}^{N} {(4457)}^{+}$	$c u u d \bar{c}$	${\frac{1}{2}}^{?} ({\frac{1}{2}}^{-})$	1²P_1/2	[16]	54422142011110
f₄(2300)	$s d \bar{s} \bar{d}$	0⁺(4⁺⁺)	1^??₄	?5?D	4231315080127	$P_{ψ}^{N} {(4440)}^{+}$	$c u u d \bar{c}$	${\frac{1}{2}}^{?} ({\frac{3}{2}}^{-})$	1⁴P_3/2	[16]	54422144031110
f₂(1640)	$s u \bar{s} \bar{u}$	0⁺(2⁺⁺)	1^??₂	?5?D	4232325040127	$P_{ψ s}^{Λ} {(4338)}^{0}$	$c u u d \bar{c}$	$0^{+} ({\frac{1}{2}}^{-})$	1²S_1/2	[40]	54422142030104
f₃(2300)	$s u \bar{s} \bar{u}$	0⁺(3⁺⁺)	1^??₃	?5?D	4232325060127	$P_{π_{u}^{0}}^{Λ_{c}^{+}}$	$c u u d \bar{u}$	$0^{+} ({\frac{1}{2}}^{-})$	1²S_1/2	[41]	54422122010104
ω(2290)	$s u \bar{s} \bar{u}$	0^-(1^–)	1^??₃	[42]	423232?020??0	$P_{π_{d}^{0}}^{Λ_{c}^{+}}$	$c u d d \bar{d}$	$0^{+} ({\frac{1}{2}}^{-})$	1²S_1/2	[41]	54421112010104
X(3250)	$s u \bar{s} \bar{u}$	?^?(?^??)	?^??_?	[42]	423232???????	$P_{π^{-}}^{Λ_{c}^{+}}$	$c u d d \bar{u}$	$0^{+} ({\frac{1}{2}}^{-})$	1²S_1/2	[41]	54421122010104
K(3100)⁰	$u d \bar{s} \bar{u}$	?^?(?^??)	?^??_?	[42]	422132???????	⋯	⋯	⋯	⋯	⋯	⋯
T_cs0(2900)⁰	$u d \bar{c} \bar{s}$	?^?(0⁺⁰)	?^??₀	[42]	422143?00????	$P_{η_{c}}^{Λ}$	$c s u d \bar{c}$	$0^{?} ({\frac{1}{2}}^{-})$	1²S_1/2	[43]	5443214201010?
T_cs1(2900)⁰	$s d \bar{c} \bar{u}$	?^?(1^-0)	?^??₁	[42]	423142?02????	$P_{J ψ}^{Λ}$	$c s u d \bar{c}$	$0^{?} ({\frac{3}{2}}^{-})$	1⁴S_3/2	[43]	54432144030010?
$T_{c \bar{s} 0} {(2900)}^{0}$	$c d \bar{s} \bar{u}$	?^?(0^?)	?^??₀	[42]	424132?00????	$P_{η_{c}}^{\sum}$	$c s u d \bar{c}$	$1^{?} ({\frac{1}{2}}^{-})$	1²S_1/2	[43]	5443214201110?
$T_{c \bar{s} 0} {(2900)}^{+ +}$	$c u \bar{s} \bar{d}$	?^?(0^?)	?^??₀	[42]	424231?00????	$P_{J ψ}^{\sum}$	$c s u d \bar{c}$	$1^{?} ({\frac{3}{2}}^{-})$	1⁴S_3/2	[43]	5443214403110?
X(3872)	$s u \bar{s} \bar{u}$	0⁺(1⁺⁺)	1¹S₁	[44]	4232321020107	$P_{D_{s}}^{Λ}$	$s s u d \bar{c}$	$0^{?} ({\frac{1}{2}}^{-})$	1²S_1/2	[43]	5433214201010?
Tcc(3875)⁺	$c c \bar{u} \bar{d}$	?^?(?^??)	?^??_?	[42]	424421???????	$P_{D_{s}^{*}}^{Λ}$	$s s u d \bar{c}$	$0^{?} ({\frac{3}{2}}^{-})$	1⁴S_1/2	[43]	5433214403010?
$T_{ψ 1}^{b} {(3900)}^{+}$	$c u \bar{c} \bar{d}$	1⁺(1^+-)	?^??₁	[45]	424242?020???	$P_{D_{s}}^{\sum}$	$s s u d \bar{c}$	$1^{?} ({\frac{1}{2}}^{-})$	1²S_1/2	[43]	5433214201110?
$T_{c \bar{c} 1} {(4200)}^{+}$	$c u \bar{c} \bar{d}$	0⁺(1^+-)	?^??₁	[46]	424241?020???	$P_{D_{s}^{*}}^{\sum}$	$s s u d \bar{c}$	$1^{?} ({\frac{1}{2}}^{-})$	1⁴S_1/2	[43]	5433214403110?
R_c0(4240)⁺	$c u \bar{c} \bar{d}$	?^?(0^–)	?^??₀	[42]	424241?00????	$P_{K}^{Ξ_{c c}}$	$c c u d \bar{s}$	$0^{?} ({\frac{1}{2}}^{-})$	1²S_1/2	[43]	5433213201010?
Zcs(4220)⁺	$c u \bar{c} \bar{s}$	?^?(1⁺⁰)	?^??₁	[42]	424243?02????	$P_{η_{c}}^{Λ_{c}}$	$c c u d \bar{c}$	$0^{?} ({\frac{1}{2}}^{-})$	1²S_1/2	[43]	5433214201010?
T_{ψ s1}(4000)⁰	$c d \bar{c} \bar{s}$	?^?(1⁺⁰)	?^??₁	[42]	424143?02????	$P_{D_{s}^{*}}^{\sum}$	$s s u d \bar{b}$	$0^{?} ({\frac{1}{2}}^{-})$	1²S_1/2	[43]	5433215201010?
χ_c0(4500)	$c s \bar{c} \bar{s}$	?^?(0⁺⁺)	?^??₀	[42]	424343?00????	$P_{K}^{p}$	$u u d d \bar{s}$	$0^{?} ({\frac{1}{2}}^{-})$	1²S_1/2	[43]	5422114201010?
χ_c1(4685)	$c s \bar{c} \bar{s}$	?^?(1⁺⁺)	?^??₁	[42]	424343?02????	$P_{K^{*}}^{p}$	$u u d d \bar{s}$	$0^{?} ({\frac{5}{2}}^{-})$	1⁴P_5/2	[43]	5422114405011?
X(4630)	$c s \bar{c} \bar{s}$	1^-(1^-+)	?^??₁	[46]	424343?022???	$P_{K}^{Δ}$	$u u u d \bar{s}$	$1^{?} ({\frac{5}{2}}^{-})$	1⁴P_5/2	[43]	5422214405111?
Y(4008)	$c s \bar{c} \bar{s}$	1^-(1^–)	1¹P₁	[46]	4243431022110	⋯	⋯	⋯	⋯	⋯	⋯
Y(4260)	$c s \bar{c} \bar{s}$	1^-(1^–)	1³P₁	[46]	4243433022110
Y(4360)	$c s \bar{c} \bar{s}$	1^-(1^–)	2¹P₁	[47]	4243431022210
Y(4660)	$c s \bar{c} \bar{s}$	1^-(1^–)	2³P₁	[47]	4243433022210
T_4c(6020)	$c c \bar{c} \bar{c}$	0⁺(1^+-)	1³S₁	[48]	4244443020106
T_4c(6600)	$c c \bar{c} \bar{c}$	0⁺(2^–)	1⁵P₂	[48]	4244445020114
⋯	$c c \bar{c} \bar{c}$	⋯	⋯	⋯	⋯

Summary

This study proposes a novel encoding mechanism for particle physics that is expected to meet the requirements of digital registration and computational simulation over a long period of time. Although the particle codes reported in this paper have not yet been fully determined and may even contain errors, users can make corresponding corrections based on experimental data or their own choices. New particles that are not included in the text or that will be discovered in the future can also be easily encoded by the proposed mechanism. This study was inspired by discussions held within an academic conference. Current computer simulation models require more distinguishable particle codes, and more information must be included in the particle codes.

References

C. Patrignani, K. Agashe, G. Aielli et al., (Particle Data Group),

Review of Particle Physics

. Chin. Phys. C 40, 100001 (2016). https://doi.org/10.1088/1674-1137/40/10/100001