Abstract. In this paper we prove a longstanding conjecture by Freeman Dyson concerning the limiting shape of the crank generating function. We fit this function in a more general family of inverse theta functions which play a key role in physics.
Using jagged overpartitions, we give three generalizations of a weighted word version of Capparelli's identity due to Andrews, Alladi and Gordon, and present several corollaries.
We study the generating functions for cylindric partitions with profile (c 1 , c 2 , c 3 ) for all c 1 , c 2 , c 3 such that c 1 + c 2 + c 3 = 5. This allows us to discover and prove seven new A 2 Rogers-Ramanujan identities modulo 8 with quadruple sums, related with work of Andrews, Schilling, and Warnaar.
The partition identities of Capparelli and Primc were originally discovered via representation theoretic techniques, and have since then been studied and refined combinatorially, but the question of giving a very broad generalisation remained open. In these two companion papers, we give infinite families of partition identities which generalise Primc's and Capparelli's identities, and study their consequences on the theory of crystal bases of the affine Lie algebra A(1)In this first paper, we focus on combinatorial aspects. We give a n 2 -coloured generalisation of Primc's identity by constructing a n 2 × n 2 matrix of difference conditions, Primc's original identities corresponding to n = 2 and n = 3. While most coloured partition identities in the literature connect partitions with difference conditions to partitions with congruence conditions, in our case, the natural way to generalise these identities is to relate partitions with difference conditions to coloured Frobenius partitions. This gives a very simple expression for the generating function. With a particular specialisation of the colour variables, our generalisation also yields a partition identity with congruence conditions.Then, using a bijection from our new generalisation of Primc's identity, we deduce two families of identities on (n 2 − 1)-coloured partitions which generalise Capparelli's identity, also in terms of coloured Frobenius partitions. The particular case n = 2 is Capparelli's identity and the case n = 3 recovers an identity of Meurman and Primc.In the second paper, we will focus on crystal theoretic aspects. We will show that the difference conditions we defined in our n 2 -coloured generalisation of Primc's identity are actually energy functions for certain A(1) n−1 crystals. We will then use this result to retrieve the Kac-Peterson character formula and derive a new character formula as a sum of infinite products for all the irreducible highest weight A(1) n−1 -modules of level 1.
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