Intuitionistic Strong Löb logic $$\textsf{iSL}$$
iSL
is an intuitionistic modal logic with a provability interpretation. We introduce $$\textsf{GbuSL}_{\Box } $$
GbuSL
□
, a terminating sequent calculus for $$\textsf{iSL}$$
iSL
with the subformula property. $$\textsf{GbuSL}_{\Box } $$
GbuSL
□
modifies the sequent calculus $$\textsf{G3iSL}_{\Box } $$
G
3
iSL
□
for $$\textsf{iSL}$$
iSL
based on $$\textsf{G3i} $$
G
3
i
, by annotating the sequents to distinguish rule applications into an unblocked phase, where any rule can be backward applied, and a blocked phase where only right rules can be used. We prove that, if proof search for a sequent $$\sigma $$
σ
in $$\textsf{GbuSL}_{\Box } $$
GbuSL
□
fails, then a Kripke countermodel for $$\sigma $$
σ
can be constructed.