You are currently looking at Flamebate, our community forums. Players can discuss the game here, strategize, and role play as their characters.
You need to be logged in to post and to see the uncensored versions of these forums.
BBBBBBBBBRRRRRRRRRRRAAAAAAAAAAAPPPPPPPPPPPPPPPPP  


snnnnniiiiiiffffffffffff…oh yes my dear….sssnnnnnnnnnnnniiiiiiiiffffffff….quite pungent indeed…is that….dare I say….sssssssnniff…eggs I smell?......sniff sniff….hmmm…yes…quite so my darling….sniff….quite pungent eggs yes very much so …..ssssssssssssssnnnnnnnnnnnnnnniiiiiiiffffff….ah yes…and also….a hint of….sniff….cheese…..quite wet my dear….sniff…but of yes…this will do nicely….sniff…..please my dear….another if you please….nice a big now….BBBBBBRRRRRRRAAAAAAAPPPPPPPFFFFFFFFLLLLLLLLLPPPPPPPPPFFFFFF Oh yes…very good!....very sloppy and wet my dear….hmmmmm…is that a drop of nugget I see on the rim?...hmmmm…..let me…..let me just have a little taste before the sniff my darling…....hmmmmm….hmm..yes….that is a delicate bit of chocolate my dear….ah yes….let me guess…curry for dinner?....oh quite right I am….aren’t I?....ok….time for sniff…..sssssnnnnnnniiiiiiiiffffffff…..hmmm…hhhmmmmm I see…yes….yes indeed as well curry…...hmmm….that fragrance is quite noticeable….yes…..onion and garlic chutney I take it my dear?.....hmmmmm….yes quite…..BBBBBBRRRRRRRRPPPPPPFFFFFFFFFFFFFFFFFFFFFTTTTTTTTTTT Oh I was not expecting that…that little gust my dear….you caught me off guard…yes…so gentle it was though…hmmmm…let me taste this little one…just one small sniff…..sniff…ah….ssssssnnnnnniiiiiffffffffffff…and yet…so strong…yes…the odor….sniff sniff…hmmm….is that….sniff….hmmm….I can almost taste it my dear…..yes….just…sniff….a little whiff more if you please…..ssssssnnnnnniiiiiffffffffff…ah yes I have it now….yes quite….hhhhmmmm…delectable my dear…..quite exquisite yes…..I dare say…sniff….the most pungent one yet my dear….ssssnnnnniiiifffffffffffffffffffffff….yes…. 

Posted On: 03/01/2019 8:39AM  View stealingtime's Profile  #  

hi 

Posted On: 03/05/2019 2:10AM  sdgrbbum09  #  
Def: Let p : E → B be a map. If f : X → B is a map, a lifting of f is a map
f : X → E such that p ◦
f = f Diagrams: E p
X f
f B (E,e0) p
(I,0) f
f
(B,b0) Lemma: (Path Lifting) Let p : E → B be a covering map. Let p(e0) = b0. Any path f : [0,1] → B beginning at b0 has a unique lifting to a path
f in E beginning at e0. Mth 632 – Winter 2009 Path and Homotopy Lifting 1/5 Homotopy Lifting Lemma: (Homotopy Lifting) Let p : E → B be a covering map. Let p(e0) = b0. Any homotopy H : [0,1]×[0,1] → B with H(0) = b0 has a unique lifting to a homotopy H
in E with H(0) = e0. If H is a path homotopy, so is H
. (E,e0) p
(I ×I,0) H H
(B,b0) Mth 632 – Winter 2009 Path and Homotopy Lifting 2/5 Lifting Correspondence Thm: Let p : E → B be a covering map. Let p(e0) = b0. paths f and g from b0 to b1 are path homotopic iff
f and
g, the lifts of f and g beginning at e0, end at the same point and are path homotopic. Def: Let p : E → B be a covering map. Let b0 ∈ B. Choose an e0 so that p(e0) = b0. Given [f] ∈ π1(B,b0), let
f be the lifting of f to a path in E beginning at e0. Let φe0(f) be
f(1). φe0 : π1(B,b0) → p−1(b0) is called the lifting correspondence derived from p. Mth 632 – Winter 2009 Path and Homotopy Lifting 3/5 Fundamental G 

Posted On: 03/05/2019 10:07AM  View jiggaloon's Profile  #  