One of the phenomena associated with self-avoiding walks and statistical physics models in general is the notion of universality, that is, independence of macroscopic observables from microscopic details, such as the choice of the lattice. One important quantity that appears in conjectures for universal laws is the connective constant, defined as follows. Let c_n denote the number of n-step self-avoiding walks. Since every (n + m)-step self avoiding walk can be decomposed into an n-step self-avoiding walk and an m-step self-avoiding walk, it follows that c_n+m ≤ c_nc_m. Therefore, the sequence {log c_n} is subadditive and we can apply Fekete's lemma to show that the following limit exists:

${\displaystyle \mu =\lim _{n\to \infty }c_{n}^{\frac {1}{n}}.}$ 

μ is called the connective constant, since c_n depends on the particular lattice chosen for the walk so does μ. The exact value of μ is only known for the hexagonal lattice, where it is equal to:^[5]

${\displaystyle {\sqrt {2+{\sqrt {2}}}}.}$ 

For other lattices, μ has only been approximated numerically, and is believed not to even be an algebraic number. It is conjectured that^[6]

${\displaystyle c_{n}\approx \mu ^{n}n^{\frac {11}{32}}}$ 

as n → ∞, where μ depends on the lattice, but the power law correction ${\displaystyle n^{\frac {11}{32}}}$  does not; in other words, this law is believed to be universal.

Self-avoiding walks have also been studied in the context of network theory.^[7] In this context, it is customary to treat the SAW as a dynamical process, such that in every time-step a walker randomly hops between neighboring nodes of the network. The walk ends when the walker reaches a dead-end state, such that it can no longer progress to newly un-visited nodes. It was recently found that on Erdős–Rényi networks, the distribution of path lengths of such dynamically grown SAWs can be calculated analytically, and follows the Gompertz distribution.^[8] For arbitrary networks, the distribution of path lengths of the walk, the degree distribution of the non-visited network and the first-hitting-time distribution to a node can be obtained by solving a set of coupled recurrence equations.^[9]

Consider the uniform measure on n-step self-avoiding walks in the full plane. It is currently unknown whether the limit of the uniform measure as n → ∞ induces a measure on infinite full-plane walks. However, Harry Kesten has shown that such a measure exists for self-avoiding walks in the half-plane. One important question involving self-avoiding walks is the existence and conformal invariance of the scaling limit, that is, the limit as the length of the walk goes to infinity and the mesh of the lattice goes to zero. The scaling limit of the self-avoiding walk is conjectured to be described by Schramm–Loewner evolution with parameter κ = 8/3.

• Critical phenomena – Physics associated with critical points
• Hamiltonian path – Path in a graph that visits each vertex exactly once
• Knight's tour – Mathematical problem set on a chessboard
• Random walk – Mathematical formalization of a path that consists of a succession of random steps
• Snake – Video game genre
• Universality – Properties of systems that are independent of the dynamical detailsPages displaying wikidata descriptions as a fallback

• OEIS sequence A007764 (Number of nonintersecting (or self-avoiding) rook paths joining opposite corners of an n X n grid)—the number of self-avoiding paths joining opposite corners of an N × N grid, for N from 0 to 12. Also includes an extended list up to N = 21.
• Weisstein, Eric W. "Self-Avoiding Walk". MathWorld.
• Java applet of a 2D self-avoiding walk
• Generic python implementation to simulate SAWs and expanding FiberWalks on a square lattices in n-dimensions.
• Norris software to generate SAWs on the Diamond cubic.