Approximation and interpolation by large entire cross-sections of second category sets in Rn+1 Burke, Maxim R.

Liftings for Haar measure on (0,1)K Burke, Maxim R.; Just, W.

Punctually countable coverings by means of negligible sets Burke, Maxim R.

Sets on which measurable functions are determined by their range Burke, Maxim R.; Ciesielski, K.

Simultaneous approximation and interpolation of increasing functions by increasing entire functions Burke, Maxim R.

Shelah's pcf theory and its applications Burke, Maxim R.; Magidor, M.

Various products of category densities and liftings Burke, M. R.; Macheras, N. D.; Musiał, K.; Strauss, W.

Liftings for noncomplete probability spaces Burke, Maxim R.

Continuous functions which take a somewhere dense set of values on every open set (vol 103, pg 95, 2000)--correction Burke, Maxim R.

Powers of the ideal of Lebesgue measure zero sets Burke, Maxim R.

Hechler's theorem for the null ideal Burke, Maxim R.; Kada, M.

A proof of Hechler's theorem on embedding N-1-directed sets cofinally into (omega(omega), Burke, Maxim R.

Large entire cross-sections of second category sets in Rn+1 Burke, Maxim R.

Models in which every nonmeager set is nonmeager in a nowhere dense Cantor set Burke, Maxim R.; Miller, A. W.

Bounded sets in topological vector spaces Burke, Maxim R.; Todorcevic, S.

Sets of range uniqueness for classes of continuous functions Burke, Maxim R.; Ciesielski, K.

Category product densities and liftings Burke, Maxim R.; Macheras, N. D.; Musial, K.; Strauss, W.

Liftings and the property of Baire in locally compact groups Burke, Maxim R.

Characterizing uniform continuity with closure operations Burke, Maxim R.

Linear liftings for noncomplete probability spaces Burke, Maxim R.; Shelah, S.

Continuous functions which take a somewhere dense set of values on every open set Burke, Maxim R.

Borel measurability of separately continuous functions, II Burke, Maxim R.

A note on measurability and almost continuity Burke, Maxim R.; Fremlin, D. H.

Weakly dense subsets of the measure algebra Burke, Maxim R.