Cross t-intersecting families for symplectic polar spaces

Abstract

Let P be a symplectic polar space over a finite field Fq, and Pm denote the collection of all k-dimensional totally isotropic subspace in P. Let F1⊂Pm1 and F2⊂Pm2 satisfy (F1 F2) t for any F1∈F1 and F2∈F2. We say they are cross t-intersecting families. Moreover, we say they are trivial if each member of them contains a fixed t-dimensional totally isotropic subspace. In this paper, we show that cross t-intersecting families with maximum product of sizes are trivial. We also describe the structure of non-trivial t-intersecting families with maximum product of sizes.