notation "- term 65 a" with precedence 65
for @{ 'uminus $a }.
-notation "a !"
- non associative with precedence 80
-for @{ 'fact $a }.
-
notation "\sqrt a"
non associative with precedence 65
for @{ 'sqrt $a }.
notation "hvbox(\Omega \sup term 90 A)" non associative with precedence 90
for @{ 'powerset $A }.
+
notation > "hvbox(\Omega ^ term 90 A)" non associative with precedence 90
for @{ 'powerset $A }.
-notation < "hvbox({ ident i | term 19 p })" with precedence 90
-for @{ 'subset (\lambda ${ident i} : $nonexistent . $p)}.
-
-notation > "hvbox({ ident i | term 19 p })" with precedence 90
-for @{ 'subset (\lambda ${ident i}. $p)}.
-
-notation < "hvbox({ ident i ∈ term 19 s | term 19 p })" with precedence 90
-for @{ 'comprehension $s (\lambda ${ident i} : $nonexistent . $p)}.
-
-notation > "hvbox({ ident i ∈ term 19 s | term 19 p })" with precedence 90
-for @{ 'comprehension $s (\lambda ${ident i}. $p)}.
-
notation "hvbox(a break ∈ b)" non associative with precedence 45
for @{ 'mem $a $b }.
notation "hvbox(a break ∪ b)" left associative with precedence 55
for @{ 'union $a $b }. (* \cup *)
-notation "hvbox({ term 19 a })" with precedence 90 for @{ 'singl $a}.
-
(* other notations **********************************************************)
notation "hvbox(a break \approx b)" non associative with precedence 45
notation "hvbox(a break # b)" non associative with precedence 45
for @{ 'apart $a $b}.
-
-notation "hvbox(a break \circ b)"
- left associative with precedence 60
-for @{ 'compose $a $b }.
-
-notation < "↓ \ensp a" with precedence 60 for @{ 'downarrow $a }.
-notation > "↓ a" with precedence 60 for @{ 'downarrow $a }.
-
-notation "hvbox(U break ↓ V)" non associative with precedence 60 for @{ 'fintersects $U $V }.
-
-notation "↑a" with precedence 60 for @{ 'uparrow $a }.
-
-notation "hvbox(a break ↑ b)" with precedence 60 for @{ 'funion $a $b }.
notation < "term 76 a \sup term 90 b" non associative with precedence 75 for @{ 'exp $a $b}.
notation > "a \sup term 90 b" non associative with precedence 75 for @{ 'exp $a $b}.