Kirkman covering designs with even-sized holes

## Abstract A Kirkman holey packing (resp. covering) design, denoted by KHPD(__g^u^__) (resp. KHCD(__g^u^__)), is a resolvable (__gu__, 3, 1) packing (resp. covering) design of pairs with __u__ disjoint holes of size __g__, which has the maximum (resp. minimum) possible number of parallel classes.

A holey Schr6der design of type h"~'h"22 ... h~ k (HSD(h]'h~ .... h~k)) is equivalent to a frame idempotent SchrBder quasigroup (FISQ(h]lh~ .... h~?)) of order n with n~ missing subquasigroups (holes) of order hi, (1 ~< i ~< k), which are disjoint and spanning, that is, ~1 <~ i <~ k nlhi = n. In thi

Let M = {m1 , m2 , . . . , m h } and X be a v-set (of points). A holey perfect Mendelsohn designs (briefly (v, k, λ) -HPMD), is a triple (X, H, B), where H is a collection of subsets of X (called holes) with sizes M and which partition X, and B is a collection of cyclic k-tuples of X (called blocks)

## Abstract A __t__‐(__v__, __k__, λ) covering design is a set of __b__ blocks of size __k__ such that each __t__‐set of points occurs in at least λ blocks, and the covering number __C__~λ~(__v__, __k__, __t__) is the minimum value of __b__ in any __t__‐(__v__, __k__, λ) covering design. In this ar